Meromorphic Functions That Share Four Small Functions

In this paper, we give some uniqueness theorems for meromorphic functions that share two values. Particularly, a positive answer to a question posed by Gross is derived.

In this paper, by studying the counting functions of the common 1-points of meromorphic functions, a more precise relation between the characteristics of meromorphic functions that share three values CM has been obtained. As applications of this, many known results can be improved.

In this paper, we study the normality of a family of meromorphic functions concerning shared values and prove the following theorem: Let F F be a family of meromorphic functions in a domain D, let k G 2 be a positive integer, and let a, b, c be complex numbers such that a / b. If, for each f g F F,

In this paper, we prove a result that if two entire functions share one small function CM and two other small functions IM, then f is a quasi-Möbius transformation of g, which generalizes G. G. Gundersen's 2CM + 2IM Theorem (see G. G.